The heat trace on singular algebraic threefolds (Q688325)

Let \(X\) be a complex projective algebraic threefold with isolated singularity set \(\Sigma\). Consider the Laplacian \(\overline \Delta= \overline{\delta d}\) with respect to the induced Fubini-Study metric on the noncompact smooth locus \(X- \Sigma\) acting on square integrable functions. The main result of this paper is Theorem. The trace of the heat operator \(\overline e^{t\overline\Delta}\) is finite and satisfies \(\text{Tr }e^{- t\overline\Delta}\leq Kt^{-3}\) for \(t\in (0,T]\), suitable \(T>0\), and \(K>0\).